Full Cut Elimination and Interpolation for Intuitionistic Logic with Existence Predicate

Maffezioli, Paolo; Orlandelli, Eugenio

doi:10.18778/0138-0680.48.2.04

Full Cut Elimination and Interpolation for Intuitionistic Logic with Existence Predicate

Maffezioli, Paolo
Orlandelli, Eugenio

Revista:

Bulletin of the Section of Logic

ISSN: 2449-836X, 0138-0680

Año de publicación: 2019

Volumen: 48

Número: 2

Páginas: 137-158

Tipo: Artículo

DOI: 10.18778/0138-0680.48.2.04 GOOGLE SCHOLAR Acceso abierto editor

Otras publicaciones en: Bulletin of the Section of Logic

Resumen

In previous work by Baaz and Iemhoff, a Gentzen calculus for intuitionistic logic with existence predicate is presented that satisfies partial cut elimination and Craig's interpolation property; it is also conjectured that interpolation fails for the implication-free fragment. In this paper an equivalent calculus is introduced that satisfies full cut elimination and allows a direct proof of interpolation via Maehara's lemma. In this way, it is possible to obtain much simpler interpolants and to better understand and (partly) overcome the failure of interpolation for the implication-free fragment.